Rates of manganese oxidation in aqueous systems

Rates of manganese oxidation in aqueous systems

Rates of manganese oxidation in aqueous systems U.S. Geological Survey. Menlo Park. CA 94025. U.S.A. Abstracts The rate of crystal growth of Mn,0...

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Rates of manganese oxidation in aqueous systems

U.S. Geological

Survey.

Menlo

Park. CA 94025. U.S.A.

Abstracts The rate of crystal growth of Mn,04 (hausmannite) and /jMnOOH (feitknechtite~ in aerated aqueous manganous perchlorate systems, near 0.01 M in total manganese, was determined at pH Ievels ranging from 7.00 to 9.00 and at temperatures from 0.5 to 37.4’C. The process is autocatalytic. but surface IS large becomes psuedo first-order in dissolved Mn’ + activity when the amount of precipitate compared to the amount of unreacted manganese. Reaction rates determined by titrations using an automated pH-stat were fitted to an equation for precipitate growth. The rates are proporiional to surface area of oxide and degree of supersaturation with respect to Mn”+. The oxide obtained at the higher temperature was Mn,O,, but at 0.5 C only fiMnOOH was formed. At intermediate temperatures. mixtures of these solids were formed. The rate of precipitatiol~ of hausm~tnnite is strongly influenced by temperature, and that of feitknechtite much less so. The difference m activation energy may be related to differences in crystal structure of the oxides and the geometry of polymeric hydroxy ion precursors.

INTRODCCTION WHFN

SOLUTIONS containing

divalent

manganese

are

7.0 and 9.0 and are treated with air or oxygen in the laboratory the product is generally a variable mixture of manganese oxyhydroxide species with the manganese valence ranging from about 2.67 to about 3.0. The form of the oxide evidently is dependent on the experimental conditions. but existing literature does not provide a clear indication of the relative importance of such factors nor their possible relationship to observed reaction rates. The kinetics of the oxidation process have been studied by several investigators who have in general agreed that the reaction is catalyzed by various mineral surfaces, and especially by pre-existing manganese oxide (MORGAN, 1967; VANDER WIEDGEN. 1975; Hm, 1964). The autocatalytic nature of the oxidation implied by the above effect has also been evaluated (MORG.AN. 1967: WILSON, 1980) but the published rate expressions contain terms that are not easily extrapolated to other experimental conditions. The work described here was done to define more closely some factors that influence the oxidation state and crystal form of laboratory manganese oxide precipitates, and to evaluate the autocatalytic reaction rates in terms that could be more readily applied to natural systems. The effects of temperature, and the crystal form and surface area of the product on kinetics of the reaction also were studied. brought

to pH’s between

EXPERISfENTAL

tinuously into the solution and solids were kept in suspension by vigorous stirring. The pH sensmg elements acre saturated calomel and glass electrodes. Reaction temperature was controlled by Immersing the container in a constant temperature bath (~0.1 Cl. The initial solutmns were lOOmI aliquots of 0.01 or 0.02 M MniC’lOd)Z. The Mn(CIO,)Z stock solution was made by reacting reagent grade manganese metal and perchloric acid. The crystal form of the precipitates was identified by tr~nsmjssion electron mtcroscopy. electron diffraction and X-raq diffraction. Surface areas of selected samples were meaaurcd by the BET procedure. Oxidation state of precipitated manganese was determined by dissolving a portion of the oxide 111 a small known excess of oxalic acid followed by back titration with permanpanate. Oxidation numbers obtamed b> this method have an experimentai uncertainty of about +0.05. Dissolved manganese determmations were made as required using atomic absorption flame spectrophotometry. The automation of the rate titrations facilitated the work by allowing for a series of runs at different temperature and pH. and the pH was closely controlled without the need for a solution butl’er which might have aFTected !he reaction mechanism A summary of the experimental data for 16 precipitations is given in Table 1. The holding pH’s used ranged from 7.00 to 9.00 and temperatures from 37.4 to 0.5 ‘C. The X-ray diffractograms for the solids containing SMnOOH showed a characteristic strong oeak at J.h2)% and weaker ones at smaller n spacings. These results and patterns for MnJOn correspond to those reported by BRKKIZR (1965). The thin plates with characteristic hexagonal shapes characteristic of ~~MnOOH contrasted strongly with the small nearly cubic hausmanmte crystals when vlewed with the transmission electron mlcroscope. The X-ray identifications were made by R. 13. FfxRxtkx and electron microscopy was done by C. J. LINI). both of the U.S. Geological Survey.

klETHODS

The reaction rate measurements were made using an automated titrator operating in a pH-stat mode. This equipment maintained a constant pH (within about 10.05 unit) in the experimental solutions by adding 0.15 M NaOH solution in small increments. The rate of base addition was recorded continuously. Air that had been passed through a carbon dioxide removal train was bubbled con-

CALCULATION

OF OXIDATION

RATE

For the precipitation of hausmannite in aerated the net process can be summarized as

sol-

utions,

3Mn2 + + &(aq)

+ 3H20 = Mn,O,(c)

+ 6H-.

(1)

J. D. HEM

1370

Similarly, for PMnOOH 2Mn2+ + +O,(aq)

+ 3Hz0 = ZMnOOH(c)

+ 4H’.

(la)

When the pH and oxygen supply are held constant, rate expression having the form -d[Mt?+] __~ dt

= kI[Mn2+]

+ k,A..,,,,[Mn’+]

a

(2)

can be postulated for either reaction under these conditions. This rate law is analogous to one given by STUMMand MORGAN (1970. p. 535) for autocatalytic oxidation of manganese. The [Mn2 ‘1 terms represent thermodynamic activity of dissolved unreacted manganese and AMnpp, represents the availability of reaction sites on the surface of the precipitated manganese oxide. The two rate constants k, and k, represent, respectively, the relatively slow precipitation reaction of dissolved manganese that is not specifically interacting with any surface, and the autocatalytic influence of an increasing availability of reaction sites as the reaction increases the area of oxide surface. In the solutions studied, the amount of precipitate present at any given time was calculated from the quantity of hydroxide added up to that point in the titration. The surface area of the precipitate was estimated from BET measurements which were made on

Table 1.

some of the preparations of the Mn,O, and PMnOOH at the end of the titrations. It was assumed that the area per unit weight was the same throughout the precipitation process. The area of surface thus derived was used to represent Ahlnpp,. Activity coefficients for Mn2 r were computed from the Debye Hiickel equation and Mn’ + solution complexes were assumed to be absent. Integrated forms of the autocatalytic rate equation. for testing experimental data, were published bq MORGAN(1967) and by STUMM and MORGAN (1970). It was shown by the latter authors that a plot of

Wwtl log [Mn’-lo

L [Mnppt]

versus time yields a straight line when the autocatalytic mechanism is predominant and only the last term of eqn (2) needs to be considered. The activity of precipitated manganese was calculated from stoichiometry of the solution and would therefore be in terms of moles per liter. It is the equivalent of Ab,.I,,,,, in eqn (2). The activity of Mn’+ at time I is obviously equal to [Mn& - [Mnppt]. The slope of the line could be used to compute an operational rate constant /&, as described by WILSON (1980). Also it follows from eqn (2) that when [Mnppt] becomes large and [Mn’ ‘1 small the former quantity will remain relatively constant over considerable

Results of manganese oxidation rate experiments

PH

Temp. "C

Avg Mn oxidn. state

K16

7.00

37.0

2.74

Hausmannlte

K15

7.50

37.1

2.63

do.

K17

8.00

37.4

2.64

K13

8.00

24.6

2.66

Solution number

Surface area m2g-1

Identified solid species

ki' 10-4.92 la-3.7a 10_3.10 lo-4.42 lo-3.64

K37

a .45

25.0

2.63

K28

a.50

25.4

2.67

K21

a.95

17.0

2.68

K24

a.50

17.0

2.67

K33

a.00

10.0

2.87

BMnOOH, some hausmannite

K32

a.50

10.0

2.83

BMnOOH, some hausmannite

K31

a.50

0.5

3.01

BMnOOH

K44

a.50

0.5

2.97

K27

a.95

0.5

3.03

10_3.50 Hausmannite 48

99

do.

SMnOOH

K30

9.00

0.5

3.03

do.

K29

a.97

0.5

3.07

do.

K36

9.01

0.5

3.02

a3

(Units for ki' are liter sec.-1 meter-'.)

10_3.71

do.

-4.65 10 10_4.90 lo-4.la 10_4.30 10_4.32 10_4.39

Rates of manganese

oxidation

periods of time even though [Mn’+] continues to decrease at a constant rate. This implies that the oxidation reaction should become psuedo first order with respect to dissolved manganese, if other factors do not change. This behavior has commonly been observed in laboratory and field systems (WILSON. 19X0: LEWIS, 1976). Natural aqueous systems in which manganese oxide deposition occurs are generally open systems where reactant activities are maintained by convective transport in moving water toward the oxide surface. It can be shown that one liter of ground water or soil moisture can come in contact with as much as 104m’ of mineral surface while moving through a porous medium for a net distance of 1 m (HEM, 1977). Water flowing m an open stream channel carries suspended sediment and has a less intimate contact with surfaces in its bed and banks. When these facts are taken into account it is obvious that the role of the surface in mediating or promoting the reaction is vitally important and a kinetic expression in which surface area of precipitate appears directly is desirable. The form in which this factor appears in the STUMMand MORGAN (I 970) expression is. in effect. as a concentration of solid surface in a litter of solution in a closed stationary reactor. For some natural systems such information IS not conveniently available, nor is the concept of a closed system always realistic. Reaction rate expressions that are more directly compatible with transport and mass-balance models of open natural aqueous systems can be developed from equations for precipitate accretion or crystal growth rates. Work published by NIELSEN (1964) and by NAXOL~.~S (1968) for example, indicated such processes can be represented in general by the relationship Rpptn

= kA S

(3)

when Rpptn is the rate of crystal formation, k is a rate constant. A is a measure of the availability of surface reaction sites and S is the degree of supersaturation in the solution phase. The exponent n represents the order of the reaction with respect to the solute of concern. In the experimental solutions studied here the reaction

3Mn”

+ l/2 O,(aq)

+ 60H-

= Mn304

+ 3H,O (4)

or an equivalent process for the formation of feitknechtite can be evaluated from the recorder chart trace which shows the rate of OH- addition. This rate should be double the rate of Mn” oxidation, assuming no feedback of reactants owing to disproportionation of Mn3+. Specific surface area measurements by the BET procedure for precipitated oxide should represent the availability of surface reaction sates. The degree of supersaturation can be formally represented as a reaction athnity or chemical poten-

in aqueous

1371

systems

tial. or in a more simple form as the ratio of activity quotient of solutes at time t to the activity quotient at equilibrium. The latter is equal to the thermodynamic equilibrium constant. In this approach

The reaction may stop before the activity quotient ratio attains a value of one. owing to an energy barrier that must be surmounted in the crystallization process. Another approach to the evaluation of S that is appropriate for irreversible experimentally controlled systems is to equate it to the difference between the activity of an uncontrolled solute at time t and its limiting activity at equilibrium. (LIV and NAKOLLAS, 1970). In the experiments discussed here the only solute varying in activity is Mn2+. During the period of the titration [MnJ is ahvays substantially greater than [Mn] eq. It is therefore justifiable to postulate that S is directly proportional to [Mn], in these experimental solutions. The rate of precipitation of manganese oxide after an induction period during which a substrate of oxide surface is formed should therefore be predicted by the expression AMnppt ~ = At In a rearranged

~~&JMnl:

logarithmic

form

log AElpE = log k; + n log[Mn],. PPI

(7)

Values for AMnppt,Af were obtained by subdividing the pH-stat recorder trace into 10min or shorter intervals. Experimental data plotted in this form should give a straight line of slope n and intercept log hi. Data for seven experimental runs at various pH’s and temperatures are plotted according to this procedure in Figs l-3. In Figs 1 and 2, the points lie on or near straight lines of unit slope drawn on the graphs, except for the early part of the reaction. The points in Fig. 3 represent two experimental runs at 0.5’C. where the solid was BMnOOH. In the latter parts of both runs, the reaction order with respect to Mn2+ appears to increase to a value between 1.0 and 2.0, but the analytical data have greater uncertainty as concentrations became smaller, and the deviations from first order may be an artifact. Rate constants are given in Table 1, as ki for data treated in the manner used for preparing Figs l-3. using a value of 1.0 for n. DISCUSSION

OF THE RESULTS

Values of I<; are in unconventional units and relate to the specific system from which they were derived. However. because volume of solution and total

J. D HEM

1377

lQ501 Id0





’ ’ 10m30 LMn”1



’ -4 IO



0

I



I I



P

mol /I

Fig. 1. Effect of dissolved Mn” actlvlty and pH on manganese oxide precipitation rate at temperatures near 31

c.

amount of manganese were nearly the same in all these experiments, the constants should be comparable among themselves for indicating reaction order with respect to Hi activity and to indicate effects of temperature on reaction rate. Manganese precipitates formed at 37 C (Fig. 1) did

not have average oxidation states above Mn” “The derived rate constants increase by about a facto] of 100 between pH 7.0 and 8.0. which indicates an apparent second-order dependence on hydroxide 1011 activity in agreement with earher work (Ht..v. 1964: MOKGAZU. 1967). Preclpltates that wcrc formod at 0.5 c’ (Fig, 3) had an Mn o\ldation state near 3.(H). The etfect of temperature on the manganese precipitation reaction is partlcularl! Interesting. In systems held at 25 and 37 C. the oxidation state of the precipitated manganese ih near the the theoretical value for hausmannite in most mstanccs. as mdicatcd by data in Table 1. In a few of the precipitations made at these temperatures. feitknechtitc could hc detected by X-ray diffraction, but it ah\ ay\ was present m only minor amounts. compared to the predominant hausmannite species. When the reaction was carried on nca~- 0 c‘. the oxidation state of the manganese preqltated waz always nearly 3.0 and only /IMnOOH could bc detected by X-ray diffraction. ,At mtermcdlatc temperatures. especially betwcon 10 and 20 C‘. the product was a rather unpredlctahlc mixture. bu: /jMnOOH was about half or a little more than half of the oxide precipitated at IO C‘. Prcclpltatlon\ made at 17 C had a rather wldc range of oxidation states and some exhibited rather poorly delined kinetic behavior. KESSK‘K and MOKGA\’ t IY75) reported the synthesis of ;I manganese 3+ oxide at 75 C I\ hich uas identified chemically as mangamte. No dctermm;;tion of crystal structure has reported. Then cxperlmental conditions were 5@icantlq dlffcrcnt from those dcscribed here and the results cannot he directI> compared.

,

IX

c 0

10.SO-

,I

I

x’

Xl’

Mn pptd.

m2sec

o,K31

pH850

X,K30pH900 X

,K28

pH850

Fig. 2. Effect of dissolved MnZt activity and pH on manganese oxide precipitation rates at temperatures near

25°C.

Fig.

3. Effect of dissolved MnL manganese oxide preclpitatlon

actiblty and pH rate at 0.5 C.

on

Rates of manganese

oxidation

Data in Table 1 show that the rate of precipitation of hausmannite is strongly influenced by temperature. The value of k; for K17 at 37.4’C is about 20 times as great as the correspvonding value for K13 at 24.6”C. Both solutions were reacted at pH 8.0. An exactly matching pair for temperatures of 25 and 17C is not available. but if the pH dependence of the rate at 25 C is second order, the calculated value for kg at pH 9.0 would be near lOm2.5 and about 16 times as great as the k’; value given in Table I for K21 which represents 17.0 C and pH 8.95. Direct comparisons for the kinetics of feitknechtite precipitation at different temperatures are less clearcut because the material obtained at 10 C contained substantial amounts of hausmannite. However the two solutions, K32 and K31. show only an approximate doubling of the values for /(i between 0.5 and IO C at pH 8.50. Between K32 and K44, there is nearly a 4-fold difference in the values for &. The temperature effect for feitknechtite precipitation is therefore substantially less than that for hausmannite. The precision of the determined k’; values is not sufficiently good to permit a meaningful calculation of activation energies and a part of the observed temperature effect stems from a decrease of OH activity with temperature at the selected pH values. However, it seems evident that a higher energy barrier is present in the hausmannite precipitation mechanism than exists for feitknechtite precipitation. A possible explanation for the predominance of the latter oxyhydroxide at 0.5’C may be derived from crystal structures of the oxide species and reaction paths that lead to them. The first step in the precipitation process can be postulated as the deprotonation of aquo-Mn” ions which then polymerize to form macro ions having a sheet-like hexagonal structure, a precursor of pyrochroite and approaching the composition Mn(OH),.

The very similar

structure

of /IMnOOH

would

be

in aqueous

1373

systems

reached with minimal disruption during the subsequent oxidation because all that is required is a loss of protons to maintain charge balance. The structure of hausmannite. however. is different and requires a greater degree of disruption (higher energy barrier) owing to a need for ejection of surplus water molecules. Thus one would predict that the rate of formation of Mn,O, would be more strongly temperature dependent than that of PMnOOH, and the latter turns out to be kinetically favored below about 10 C. In systems where a substantial area of mediatmg surface is present at the start of the reaction, A,,, will remain nearly constant and a psuedo first-order mechanism may be dominant throughout. Lru~s (1976) observed first-order kinetics of Mn’ ’ precipitation with respect to dissolved Mn in the Susquehanna River in Pennsylvania. First-order kinetics were observed by HEM (1964) in laboratory systems containing feldspathic sand. Fig. 4 is a plot of log [Mn’+] vs time for experiments K29 and K44 (Table I) showing straight-line relationships for the latter parts of the titrations. The slope indicates a half time of about 64min and a psuedo first-order rate constant of lo-” ‘4 set- ’ for K44. and half time of 7.5 min and k of 10 2 ” for K29. These constants. it should be emphasized, are not equivalent to h, in eqn (2). In natural systems where the available reactive surface area is in large excess, the pseudo first-order interpretation of our data suggests that the precrpitation half-time could be as short as a few days for systems at neutral pH and a temperature of 10 to 15 C. Rate constants determined by LEWIS (1976) from his Susquehanna River data give half-times of about 1 day at 20 C and about 7 days at 5 C, at pH’s near or a little below 7.0. The potential growth rate of a manganese oxide deposit can be estimated from values for !i; and eqn (6) or (7). For example. a layer 0.1 mm thick of oxide

0 K44

x K29

pH8.97

pt-! 850

0.5”

0 5”

i

[Mn’i, mol/l

I

100

50 Time Fig. 4. Psuedo

first-order

kinetic

,

,

I

250

I

I

I

300

, mtn

behavior

of manganese

In two test solutions

at 0.5 C

1374

J. D. HIM

on a square meter of pre-existing surface, assuming a density of 5.Og/‘cc for the oxide, amounts to 500g or 5.69 moles of MnOOH. The rate of precipitation per square meter per second at a dissolved Mn” activity of 10-B.’ M. at 0.5 C can be computed from data in Table I. At a pH of 8.5. this rate will bc IO- i2.” moles mm2 set ’ assuming a first-order dependence on [Mn’+]. The time required for this amount of growth is a little over 800,OOOyr if it is assumed that the effective area of substrate is a constant 1 m2 throughout the precipitation process. Another factor in the growth rate is the rate at which reactants can be moved to the surface. In this system. it would be necessary to have a sufficient rate of movement of solution toward the surface to maintain the dissolved Mn’+ activity near IO-“-“. The thermodynamic stability of BMnOOH is probably similar to that of hausmannite and is certainly sufficient to give a substantial supersaturation at this Mn2+ activity, at pH 8.5. in water with a dissolved oxygen activity of 10m3.5 M, approximately the level attained in water in contact with the atmosphere. If the dissolved manganese activity in water leaving the reaction site is decreased to 1O-8.5o M by oxide precipitation. the precipitation rate computed above can be sustained by water moving at the rate of about 3 mm per day. This flux should be relatively easy to attain. even in systems where circulation is sluggish. However, if the effective area of reacting surface per unit cross section of flow increases. the limiting flux will be greater. The rate of influx of reactants can easily become the major limiting factor on the precipitate growth rate. In systems where water movement is rapid and the kinetics of precipitation are pseudo first-order. the Hux rate may support accumulation of precipitate over an extensive surface area and, the zone of reaction in the system may be elongated in the main direction of water flow. In a surface stream, for example, there may be manganese oxide coatings on bed material for long distances downstream from points where Mn’+ is introduced. The disproportionation of MnOOH to produce MnO,, the final form of the oxide, must keep pace with the precipitation rate. and the feedback of Mn’ f that results probably will exert a catalytic effect that is not included in k’; (HEM. 1977).

Some of the foregoing computations require rather broad assumptions but they demonstrate that the rates of precipitation that were determined in our experiments are useful for evaluating some extremely slow reaction rates that may occur in natural environments. The influence of the disproportionation step in the reaction mechanism and probable catalysis effects related to coprecipitation of other transition-metal ions will be evaluated in continuing research.

‘l~k,lo~clvdgc~rl~l~~~t.\ An oral verston of thts paper was presented at the Third Inrrrnurion~~l Sypmrum on Wutrr Rod Irnrrwtion, Edmonton. July 16 19. 19X0. Reviews of the manuscript by U.S. Geological Survey colleagues L.. N. PLINMEK and ELIWAKD CALLENIXR and suggesttons by two anonymous reviewers arc acknowledged with thanks. REFERENCES BKIN;ER 0. P. (1965) Some stability relations in the system Mn 0: Hz0 at 25 C and one atmosphere total pressure. ilm. M~nertrl. 50, 1296- 1354. HEM J. D. (1964) Deposition and solution of manganese oxides. L’S. GUI/. S’urr. W’trfcr Supp/,, Pup. 1667-B. 42 pp. HEM J. D. (1977) Surface chemical processes in groundwater systems. Proc,. ?m/ lut. Swp, on M’drr Rw!, 1~ rwtrc~rion. Strasbourg, pp. IV 76 IV X5. KESSI~K M. A and MoR(,A~ J. J. (1975) Mechamsm of auto-oxidatmn of manganese in aqueous solution. Enruwl. SC,;. Td~rwl. 9, 157 159 L~M.IS D. M. (1976) The geochemtstry of manganese. iron. ut-anium. lead 210 and major tons tn the Susquehanna RiLcr. PhD Dissertation. Yale Untv. LIU S.-T. and NANCOLLAS G. H. (1970) The kinetics of crystal growth of calcium sulfate dehydrate. J. Cry,\ttri Growth 6, 2X1-289. k’iORGAU J. J. (1967) Chemical equtltbria and kmetic properties of manganese tn natural waters. In Print,ip/c\ ~J,x/ .+tpp/ic,urron.\ o/ M’trrrr C‘/rcrnr,\rr\~ (eda S. D. Faust and J. V. Hunter), pp. 561 624. Wiley. NAN(T)LI.AS G. H. (1968) Ktnetics of crystal growth from solution. ./ Cr).st[rl G,owt/r 34, 335 339. NIELSENA. E. (1964) Kmefic \ r~/ Pr?~~!piftrrion. 151 pp. Macmillan. STVMM W. and MORGAN J. J (1970) 4c/r1trr!c. Clwmi.sfr~. 5x3 pp. Wtley. STLIVMW. and GIOVASOLI R. (1976) On the nature of particulate manganese in simulated lake waters. C‘hrmitr 30, 4’3-425. VASDFR-WEIJDENC. H. (1975) Sorptton experiments reievant to the geochemistry of manganese nodules. PhD Dissertion. Univ. of Utrecht. 154 p. WILSON D. E. (1980) Surface and complexatton effects on the rate of Mn oxidation In natural waters. Grochim. Cosmochin~. Actu 44, 13I I 1317.